References
- Anderson, B. D. O., Moore, J. B., & Eslami, M. (1982). Optimal filtering. IEEE Transactions on Systems Man and Cyber, 12(2), 235–236. doi: 10.1109/TSMC.1982.4308806
- Arasaratnam, I., & Haykin, S. (2009). Cubature kalman filters. IEEE Transactions on Automatic Control, 54(6), 1254–1269. doi: 10.1109/TAC.2009.2019800
- Arasaratnam, I., Haykin, S., & Elliott, R. J. (2007). Discrete-time nonlinear filtering algorithms using Gauss-Hermite quadrature. Proceeding of IEEE, 95(5), 953–977. doi: 10.1109/JPROC.2007.894705
- Bhaumik, S., & Shovan, S. (2015). Higher degree cubature quadrature Kalman filter. International Journal of Control, Automation, and Systems (IJCAS), 13(5), 1097–1105. doi: 10.1007/s12555-014-0228-8
- Bhaumik, S., & Swati. (2013). Cubature quadrature Kalman filter. International Journal of Control, Automation, and Systems (IJCAS), 7(7), 533–541.
- Blum, A., Hopcroft, J., & Kannan, R (2015). Foundations of data science. Retrieved from http://www.cs.cornell.edu/courses/cs4850/2019sp/.
- Heissa, F., & Winschelb, V. (2008). Likelihood approximation by numerical integration on sparse grids. Journal of Econometrics, 144(1), 62–80. doi: 10.1016/j.jeconom.2007.12.004
- Horwood, J. T., & Poore, A. B. (2012). Adaptive gaussian sum filters for space surveillance. IEEE Transactions on Automatic Control, 59(1), 308–326.
- Ito, K., & Xiong, K. (2000). Gaussian filters for nonlinear filtering problems. IEEE Transactions on Automatic Control, 45(5), 910–927. doi: 10.1109/9.855552
- Jia, B., Xin, M., & Cheng, Y. (2011). Sparse Gauss-Hermite quadrature filter with application to spacecraft attitude estimation. Journal of Guidance Control and Dynamics, 34(2), 367–379. doi: 10.2514/1.52016
- Jia, B., Xin, M., & Cheng, Y. (2012). Sparse-grid quadrature nonlinear filtering. Automatica, 48(2), 327–341. doi: 10.1016/j.automatica.2011.08.057
- Jia, B., Xin, M., & Cheng, Y. (2013). High-degree cubature kalman filter. Automatica, 49(2), 510–518. doi: 10.1016/j.automatica.2012.11.014
- Julier, S. J., & Uhlmann, J. K. (1997). Consistent debiased method for converting between polar and Cartesian coordinate systems. International Symposium on Aerospace, Defense Sensing. International Society for Optics and Photonics, 3086(1), 110–121.
- Julier, S. J., Uhlmann, J. k., & Durrant-Whyte, H. F. (2000). A new method for the nonlinear transformation of means and covariances in filters and estimators. IEEE Transactions on Automatic Control, 45(3), 477–482. doi: 10.1109/9.847726
- Julier, S. J., Uhlmann, J. k., & Durrant-Whyte, H. F (1995). A new approach for filtering nonlinear systems. In IEEE American Control Conference (pp. 1628–1632).
- Lefebvre, T., Bruyninckx, H., & Schutter, J. D. (2004). Kalman filters for non-linear systems: A comparison of performance. International Journal of Control, 77(7), 639–656. doi: 10.1080/00207170410001704998
- Majidi, M. A., Hsieh, C. S., & Yazdi, H. S. (2018). Kalman filter reinforced by least mean square for systems with unknown inputs. Circuits Systems and Signal Processing, 37(11), 4955–4972. doi: 10.1007/s00034-018-0792-x
- Menegaz, H. M. T., Ishihara, J. Y., & Borges, G. A. (2015). A systematization of the unscented kalman filter theory. IEEE Transactions on Automatic Control, 60(10), 2583–2598. doi: 10.1109/TAC.2015.2404511
- Meng, D., Miao, L., & Shao, H. (2018). A seventh-degree cubature Kalman filter. Asian Journal of Control, 20(1), 250–262. doi: 10.1002/asjc.1537
- Nevels, M. D., Jia, B., & Turnowicz, M. R. (2012). Sparse grid-based orbit uncertainty propagation. Advances in the Astronautical Sciences, 142(1), 3207–3226.
- Nie, Y., & Zhang, T (2018). Some relations between unscented and cubature Kalman filters. In the 30th Chinese control and decision conference (pp. 1–6).
- Sarkka, S., Hartikainen, J., & Svensson, L (2015). On the relation between Gaussian process quadratures and sigma-point methods. In Statistics (pp. 1–13).
- Sola, J (2013). Simulataneous localization and mapping with the extended Kalman filter. Retrieved from http://www.joansola.eu/JoanSola/eng/JoanSola.html.
- Sorenson, H. W. (1985). Kalman filter: Theory and application. Piscataway, NJ: IEEE Press.
- Wang, S., Feng, J., & Chi, K. T. (2014). Spherical simplex-radial cubature Kalman filter. IEEE Signal Processing Letters, 21(1), 43–46. doi: 10.1109/LSP.2013.2290381
- Wu, Y., Hu, X., & Wu, M. (2006). A numerical-integration perspective on Gaussian filters. IEEE Transactions on Signal Process, 54(8), 2910–2921. doi: 10.1109/TSP.2006.875389
- Zhang, Y., Huang, Y., & Wu, Z (2014). Seventh-degree spherical simplex-radial cubature Kalman filter. In IEEE Control Conference (pp. 2513–2517).